Multibeam optical system

ABSTRACT

A multibeam optical system that employs a laser source emitting a laser beam, a diffractive beam-dividing element that diffracts the laser beam emitted from the laser source to be divided into a plurality of diffracted beams exiting at different diffraction angle, and a compensating optical system. compensating optical system, which is afocal and consists of a first group and a second group, arranged at the position where beams divided by a diffractive beam-dividing element are incident thereon. The compensating optical system has a characteristic such that the angular magnification thereof is inversely proportional to the wavelength of the incident beam. The angular difference among the diffracted beam caused by the wavelength dependence of the diffractive beam-dividing element can be reduced when the beams transmit the compensating optical system.

BACKGROUND OF THE INVENTION

[0001] The present invention relates to a multibeam optical system that divides a laser beam emitted from a laser source into a plurality of beams and forms a plurality of beam spots on an object surface. Particularly, the invention relates to the optical system that employs a diffractive beam-dividing element to divide a laser beam emitted from a laser source.

[0002] The multibeam optical system needs a beam-dividing element that divides a laser beam emitted from a laser source into a plurality of beams to form a plurality of beam spots on the object surface.

[0003] A conventional multibeam optical system has employed a prism-type beam splitter as the beam-dividing element, which comprises a plurality of prism blocks cemented to one another. The cemented faces of the prism blocks are provided with multi-layer coatings having the desired reflecting properties, respectively.

[0004] However, when employing a prism-type beam splitter, since each one of the multi-layer coatings can divide an incident beam only into two separate beams, the number of prism blocks corresponding to the required number of separate beams must be cemented to one another. Further, when cementing one block to another block, an angle error between two cemented face unavoidably arises. Accordingly, when a large number of separate beams are required, the deviations of the beam spots on the object surface tend to become large due to an accumulation of positional errors between the cemented prism blocks.

[0005] Recently, a diffractive beam-dividing element has become used in place of a prism-type beam splitter. Since the diffractive beam-dividing element is made of a single block that is not cemented, it does not generate any positional error even when the large number of the separate beams are required.

[0006] With employing the diffractive beam-dividing element, however, since the diffraction angle of a light beam varies depending upon the wavelength thereof, the same order diffracted beam may be separated to form a plurality of beam spots in different positions on the object surface, in case a light source emits a light beam having a plurality of peak wavelengths.

[0007] For example, an argon laser, which is used as a light source of a laser photo plotter or the like, has a plurality of peak wavelengths in the ultraviolet and visible regions. Therefore, in order to avoid the above defects, it has been required to use a filter for passing a beam component of a selected peak wavelength. Thus, the beam components of peak wavelengths other than the selected peak wavelength are cut off by the filter, which results in low energy efficiency.

[0008] Further, even if a beam emitted from a light source has a single peak wavelength, in case a peak wavelength of a beam actually emitted from a light source fluctuates or varies, a beam spot pitch on a surface to be exposed is changed.

SUMMARY OF THE INVENTION

[0009] It is therefore an object of the present invention to provide an improved multibeam optical system capable of avoiding the defect such as a separation of the same order diffracted beam or a variation of the beam spot pitch caused by the wavelength dependence of a diffractive beam-dividing element employed therein.

[0010] For the above object, according to the present invention, there is provided an improved multibeam optical system that includes a compensating optical system, which is afocal and consists of a first group and a second group, arranged at the position where beams divided by a diffractive beam-dividing element are incident thereon. The compensating optical system has a characteristic such that the angular magnification thereof is inversely proportional to the wavelength of the incident beam.

[0011] With this construction, the same order diffracted beams of the respective wavelengths diffracted by the diffractive beam-dividing element exit at the different diffraction angles, and the diffracted beams are incident on the first group of the compensating optical system. Since a diffraction angle of the diffractive beam-dividing element increases as a wavelength becomes longer, an incident angle on the compensating optical system increases as a wavelength becomes longer. On the other hand, when the angular magnification of the compensating optical system is inversely proportional to the wavelength, the ratio of an incident angle on the compensating optical system to an exit angle therefrom decreases as a wavelength becomes longer. Therefore, the angular difference among the diffracted beam caused by the wavelength dependence of the diffractive beam-dividing element can be reduced when the beams transmit the compensating optical system.

[0012] In another aspect of the invention, the following conditions (1) and (2) are satisfied to counterbalance the angular difference of the diffracted beams with the variation of the angular magnification of the compensating optical system: $\begin{matrix} {v_{1} = {\frac{f_{1} + f_{2}}{f_{1}} \cdot v_{DOE}}} & (1) \\ {v_{2} = {{- \frac{f_{1} + f_{2}}{f_{2}}} \cdot v_{DOE}}} & (2) \end{matrix}$

[0013] where ν₁ is the Abbe number of the first group, f₁ is the focal length of the first group, ν₂ is the Abbe number of the second group, f₂ is the focal length of the second group, and ν_(DOE) is a dispersive power of the diffractive beam-dividing element, which corresponds to an Abbe number of a refractive lens.

[0014] Further, it is preferable that the compensating optical system substantially satisfies the following conditions (3), (4) and (5): $\begin{matrix} {\frac{f_{1}}{v_{1}} = {- \frac{f_{2}}{v_{2}}}} & (3) \\ {f_{1} = f_{2}} & (4) \\ {v_{1} = {{- v_{2}} = {2{v_{DOE}.}}}} & (5) \end{matrix}$

[0015] Each of the first group and the second group may be an element having reflecting surfaces of a positive power on which a diffractive lens structure is formed. In such a case, the conditions (1), (2) and (5) can be satisfied without difficulty. Alternatively, each of the first and second groups may be a composite element of a positive refractive lens and a diffractive lens structure.

[0016] The first group is preferably located at a position where the distance from the diffractive beam-dividing element is equal to the focal length f₁ of the first group.

[0017] The multibeam optical system of the present invention is usually applied to a multibeam scanning optical system, however it can be applied to other systems as a matter of course.

DESCRIPTION OF THE ACCOMPANYING DRAWINGS

[0018]FIG. 1 shows a multibeam scanning optical system embodying the invention; and

[0019]FIGS. 2 and 3 are partial enlarged views of a compensating optical system in FIG. 1 showing the principle of the invention.

DESCRIPTION OF THE EMBODIMENTS

[0020] A multi-beam optical system embodying the present invention will be described hereinafter by referring to the accompanying drawings. FIG. 1 shows a multibeam scanning optical system embodying the invention; and FIGS. 2 and 3 show the principle of the invention. At first the construction of the embodiment will be described with reference to FIG. 1, and then the principle of the invention will be described with reference to FIGS. 2 and 3. In the drawings, curved mirrors, which are disposed in the optical system, are represented as if they are light transmittable elements like lenses in order to provide a clear understanding of an optical path. Therefore, the optical system is developed to make the optical axis straight in the drawings. Further, optical element such as a lens and a mirror are shown as thin lenses in the drawings.

[0021] As shown in FIG. 1, a multi-beam scanning optical system embodying the invention comprises a laser source 1, abeam expander 2, a diffractive beam-dividing element 3, a compensating optical system 4, a converging mirror 5, a multi-channel modulator 6, a collimator lens 7, a polygonal mirror 8 as a deflector, an fθ lens 9 as a scanning lens and an object surface 10 to be exposed, which are arranged in this order from left in FIG. 1.

[0022] Since the polygon mirror 8 rotate about the rotation axis that is perpendicular to the sheet of FIG. 1 to deflect the beams in a vertical direction (i.e., up-and-down direction) in FIG. 1, the vertical direction in FIG. 1 is referred to as a main scanning direction. Further, since the object surface 10 moves in a direction perpendicular to the sheet of FIG. 1 to form a two-dimensional image thereon, the direction perpendicular to the sheet of FIG. 1 is referred to as an auxiliary scanning direction.

[0023] The laser source 1 is a multiline laser source such as an argon laser having a plurality of peak wavelengths. The beam expander 2 adjusts the diameter of the laser beam emitted from the laser source 1. The diffractive beam-dividing element 3 diffracts the parallel beam from the beam expander 2 to divide it into a plurality of laser beams outputting at different angles. Further, since the diffractive beam-dividing element 3 diffracts the incident laser beams of the respective wavelengths at different angles, the same order diffracted beams of the respective wavelengths exit at the different diffraction angles from the diffractive beam-dividing element 3.

[0024] The parallel laser beams divided by the diffractive beam-dividing element 3 are, respectively, incident on the compensating optical system 4. The compensating optical system 4 consists of a first group 4 a that has a negative chromatic dispersion and a second group 4 b that has a positive chromatic dispersion. The first group 4 a is composed of a concave mirror and a diffractive lens structure having a positive power formed on the concave mirror. The second group 4 b is composed of a concave mirror and a diffractive lens structure having a negative power formed on the concave mirror. Each of the first and second groups 4 a and 4 b has a positive power as a whole. The compensating optical system 4 is an afocal optical system and the angular magnification is inversely proportional to the wavelength of the incident beam to compensate an angular difference of the same order diffracted beams caused by the wavelength dependence of the diffractive beam-dividing element 3. The same order diffracted beams of the respective wavelengths are adjusted to travel along the same optical path after the beams passing through the compensating optical system 4. Abbe numbers and focal lengths of the first and second groups 4 a and 4 b of the compensating optical system 4 are determined to achieve the compensating function, as described below. The first group 4 a is located such that the distance from the diffractive beam-dividing element 3 to the front principal point thereof is equal to the focal length f₁ of the first group 4 a. The second group 4 b is located such that the distance from the rear principal point of the first group 4 a to the front principal point of the second group 4 b is equal to the sum of the focal length f₁ of the first group 4 a and the focal length f₂ of the second group 4 b.

[0025] The parallel beams of the respective diffraction orders passing through the compensating optical system 4 are converged by the converging mirror 5. The convergent beams are aligned such that the chief rays are parallel to one another. The multi-channel modulator 6 such as an acousto-optic modulator (AOM) is located at beam waist position of the converged beams. The multi-channel modulator 6 is provided with a plurality of channels each of which changes a direction of the converged laser beam in response to the input ultrasonic wave. The detail construction of the multichannel modulator is not illustrated because the multichannel modulator is a device that is in general use. In a channel, when the ultra sonic wave is applied to a medium, a diffraction grating is formed by a compression wave caused in the medium. The diffracted beam emerges as the modulated beam, and the non-diffracted beam is cut off by a shading plate. The channels of the multichannel modulator 6 are independently controlled to independently modulate the laser beams, i.e., to independently turn ON/OFF the laser beams, respectively.

[0026] The collimator lens 7 is arranged such that the front focal point thereof is coincident with the multichannel modulator 6 on a center axis of the beams, i.e., an optical axis of the system. The modulated beams are converged into parallel beams whose beam axes intersect at the rear focal point of the collimator lens 7.

[0027] The polygonal mirror 8 is arranged such that the reflecting surface is located at the rear focal point of the collimator lens 7. The polygonal mirror 8 rotates about the rotation axis to deflect the laser beams in the main scanning direction while keeping angular difference among the laser beams of the respective diffraction orders.

[0028] The deflected laser beams are converged by the fθ lens 9 to form a plurality of beam spots aligned in the auxiliary scanning direction at equal intervals on the object surface 10. The beam spots simultaneously scan in the main scanning direction at a constant speed as the polygonal mirror 8 rotates.

[0029] Details of the compensating optical system 4 will be explained by referring to FIGS. 2 and 3. In this embodiment, the respective one of the first and second groups 4 a and 4 b comprises a concave mirror on which a diffractive lens structure is formed.

[0030] The diffractive lens structure has an advantage in its suitability for compensating the angular difference caused by the wavelength dependence of the diffractive beam dividing element 3. The dispersive power ν_(DOE) of the diffractive lens structure, which corresponds to an Abbe number of a refractive lens, is −3.453. That is, the diffractive lens structure shows a relatively large dispersive power as compared with a refractive lens, which allows the compensating optical system 4 to correct the chromatic dispersion of the diffractive beam-dividing element even if it is too large to be corrected by a refractive lens.

[0031] Further, when the diffractive lens structure is formed on the reflecting surface as described above, the chromatic dispersion in the compensating optical system 4 occurs only by the diffractive lens structures thereof, the dispersion shows a linear relationship with the wavelength of the light beam, which is suitable to cancel the chromatic dispersion caused by the diffractive beam-dividing element 3 as it shows also a linear relationship with the wavelength of the light beam.

[0032] In FIGS. 2 and 3, the laser beam of the first wavelength λ_(A) and the chief ray thereof are illustrated by solid lines, the laser beam of the second wavelength λ_(B) and the chief ray thereof are illustrated by dotted lines. Assuming that the first wavelength λ_(A) is longer than the second wavelength λ_(B.)

[0033] Since the diffractive beam-dividing element 3 has a negative chromatic dispersion, the diffraction angle of the beam of the first wavelength λ_(A) is larger than that of the second wavelength λ_(B), as shown in FIG. 3. Therefore, a height (a distance from the optical axis Ax) of an incident point and an incident angle on the first group 4 a of the compensating optical system 4 increase as the wavelength becomes longer.

[0034] The first group 4 a of the compensating optical system 4 functions to equate the intersection heights of the same order diffracted beams (particularly, the chief rays) having the respective wavelengths when the beams are incident on the second group 4 b. Accordingly, the first group 4 a must have a negative dispersion (1/ν₁<0) to increase a deviation angle as a wavelength becomes longer. Next, the value ν₁ will be found.

[0035] In FIG. 2, with respect to the chief ray of the first wavelength λ_(A),

[0036] u_(A) is an angle of the chief ray to the optical axis Ax when the ray is incident on the first group 4 a;

[0037] h_(1A) is a height of an incident point when the ray is incident on the first group 4 a;

[0038] u′_(A) is an angle of the chief ray to the optical axis Ax when the ray exits the first group 4 a;

[0039] φ_(1A) is a power of the first group 4 a; and

[0040] f_(1A) is a focal length of the first group 4 a.

[0041] In the same manner, with respect to the chief ray of the second wavelength λ_(B),

[0042] u_(B) is an angle of the chief ray to the optical axis Ax when the ray is incident on the first group 4 a;

[0043] h_(1B) is a height of an incident point when the ray is incident on the first group 4 a;

[0044] u′_(B) is an angle of the chief ray to the optical axis Ax when the ray exits the first group 4 a;

[0045] φ_(1B) is a power of the first group 4 a; and

[0046] f_(1B) is a focal length of the first group 4 a.

[0047] Assuming that the chief ray of the first wavelength λ_(A) is parallel to the optical axis Ax after a reflection by the first group 4 a and the chief rays of the first and second wavelengths λ_(A) and λ_(B) are incident at the same position on the second group 4 b. In this case, the angle u′_(A) of the chief ray of the first wavelength λ_(A) is given by the equation (1):

u′ _(A) =u _(A) +h _(1Aφ1A)  (1)

[0048] Since the chief ray of the first wavelength λ_(A) is parallel to the optical axis Ax, u′_(A)=0, and then the equation (1) is converted to

u _(A) =−h _(1Aφ1A)  (2)

[0049] On the other hand, the angle u′_(B) of the second wavelength λ_(B) is given by the equation (3):

[0050] $\begin{matrix} {u_{B}^{\prime} = {{u_{B} + {h_{1B}\phi_{1B}}} = {{\frac{\lambda_{B}}{\lambda_{A}} \cdot u_{A}} + {\frac{\lambda_{B}}{\lambda_{A}} \cdot h_{1A} \cdot \phi_{1B}}}}} & (3) \end{matrix}$

[0051] Substitution of the equation (2) into the equation (3) yields the equation (4). $\begin{matrix} \begin{matrix} {u_{B}^{\prime} = {{{- \frac{\lambda_{B}}{\lambda_{A}}} \cdot h_{1A} \cdot \phi_{1A}} + {\frac{\lambda_{B}}{\lambda_{A}} \cdot h_{1A} \cdot \phi_{1B}}}} \\ {= {\frac{\lambda_{B}}{\lambda_{A}} \cdot {h_{1A}\left( {\phi_{1B} - \phi_{1A}} \right)}}} \\ {= {\frac{\lambda_{B}}{\lambda_{A}} \cdot {h_{1A}\left( {\frac{1}{f_{1B}} - \frac{1}{f_{1A}}} \right)}}} \end{matrix} & (4) \end{matrix}$

[0052] Further, h_(1A)=−u_(A)×f_(1A) as shown in FIG. 2, the equation (4) is converted to $u_{B}^{\prime} = {{- \frac{\lambda_{B}}{\lambda_{A}}} \cdot u_{A} \cdot f_{1A} \cdot \frac{f_{1A} - f_{1B}}{f_{1A}f_{1B}}}$

[0053] Assuming that f_(1A)−f_(1B)=−Δf₁, and f_(1B)=f₁, $u_{B}^{\prime} = {\frac{\lambda_{B}}{\lambda_{A}} \cdot u_{A} \cdot \frac{\Delta \quad f_{1}}{f_{1}}}$

[0054] Since the value of Δf represents a longitudinal chromatic aberration and it is equal to −f/ν, the above equation is converted to $\begin{matrix} {u_{B}^{\prime} = {{- \frac{\lambda_{B}}{\lambda_{A}}} \cdot \frac{u_{A}}{v_{1}}}} & (5) \end{matrix}$

[0055] Further, according to FIG. 2, a condition to compensate the difference Δh₁ between h_(1A) and h_(1B) is represented as follows: $\begin{matrix} \begin{matrix} {{\Delta \quad h_{1}} = {{\left( {u_{A} - u_{B}} \right) \cdot f_{1}} = {u_{B}^{\prime} \cdot \left( {f_{1} + f_{2}} \right)}}} \\ {= {{\left( {u_{A} - {\frac{\lambda_{B}}{\lambda_{A}} \cdot u_{A}}} \right) \cdot f_{1}} = {u_{B}^{\prime} \cdot \left( {f_{1} + f_{2}} \right)}}} \\ {= {{\frac{\lambda_{A} - \lambda_{B}}{\lambda_{A}} \cdot u_{A} \cdot f_{1}} = {u_{B}^{\prime} \cdot \left( {f_{1} + f_{2}} \right)}}} \end{matrix} & (6) \end{matrix}$

[0056] On the basis of the equations (5) and (6), $\begin{matrix} {u_{B}^{\prime} = {{- \frac{\lambda_{B}}{\lambda_{A}}} \cdot \frac{u_{A}}{v_{1}}}} \\ {= {\frac{f_{1}}{f_{1} + f_{2}} \cdot \frac{\lambda_{A} - \lambda_{B}}{\lambda_{A}} \cdot u_{A}}} \end{matrix}$

[0057] It is converted to the equation (7) to solve about ν₁ as follows: $\begin{matrix} {v_{1} = {\frac{\lambda_{B}}{\lambda_{B} - \lambda_{A}} \cdot \frac{f_{1} + f_{2}}{f_{1}}}} & (7) \end{matrix}$

[0058] The equation (7) can be converted to the equation (8) because λ_(B)/(λ_(B)−λ_(A)) is equal to the equivalent Abbe number ν_(DOE) of a diffractive optical element. $\begin{matrix} {v_{1} = {\frac{f_{1} + f_{2}}{f_{1}\quad} \cdot v_{DOE}}} & (8) \end{matrix}$

[0059] The equation (8) is a condition of the Abbe number ν₁ required for the first group 4 a to equate the heights of the diffracted beams of the wavelengths λ_(A) and λ_(B) when they are incident on the second group 4 b. As described above, since the compensating optical system 4 is an afocal optical system as a whole, both of the focal lengths f₁ and f₂ take positive values. Accordingly, the Abbe number ν₁ is required to be negative. A glass lens has a positive value in the Abbe number, it is impossible to satisfy the equation (8) when the first group 4 a consists of glass lenses only. Therefore, the first group 4 a is formed as a combination of a reflection mirror that has no chromatic dispersion and a diffractive lens structure whose equivalent abbe number is negative.

[0060] An incident angle on the second group 4 b of a predetermined order diffracted beam (particularly, a chief ray) deflected by the first group 4 a increases as a wavelength becomes shorter. The second group 4 b has a function to direct the same order diffracted beams that are incident at the same position into the same direction. Accordingly, the second group 4 b must have a positive dispersion (1/ν₂>0), to increase a deviation angle as a wavelength becomes shorter. Next, the value ν₂ will be found.

[0061] In FIG. 2, with respect to the chief ray of the first wavelength ν_(A),

[0062] u″_(A) is an angle of the chief ray to the optical axis Ax when the ray exits the second group 4 b; and

[0063] φ_(2A) is a power of the second group 4 b.

[0064] In the same manner, with respect to the chief ray of the second wavelength λ_(B),

[0065] u″_(B) is an angle of the chief ray to the optical axis Ax when the ray exits the second group 4 b; and

[0066] φ_(2B) is a power of the second group 4 b.

[0067] In this case, the angle u″_(A) of the chief ray of the first wavelength λ_(A) is given by the equation (9):

u″ _(A) =u′ _(A) +h _(2φ2A)  (9)

[0068] Since the chief ray of the first wavelength λ_(A) is parallel to the optical axis Ax, u′_(A)=0, and then the equation (9) is converted to

u″_(A)=h_(2φ2A)  (10)

[0069] On the other hand, the angle u″_(B) of the second wavelength λ_(B) is given by the equation (11):

u″ _(B) =u′ _(B) +h _(2φ2B)  (11)

[0070] In order to coincide the rays of both of the wavelengths λ_(A) and λ_(B), it is required to satisfy u″_(A)=u″_(B). Therefore, the required condition (12) is obtained based on the equation (10) and (11).

u′ _(B) +h _(2φ2B) =h _(2φ2A)  (12)

[0071] This equation is converted to the equation (13) to solve about u′_(B), $\begin{matrix} \begin{matrix} {u_{B}^{\prime} = {{h_{2}\phi_{2A}} - {h_{2}\phi_{2B}}}} \\ {= {h_{2}\left( {\phi_{2A} - \phi_{2B}} \right)}} \end{matrix} & (13) \end{matrix}$

[0072] Combining the equations (4), (13) and substituting h₂=h_(1A) for the combined equation yields the equation (14). $\begin{matrix} {{{h_{2} \cdot \left( {\phi_{2A} - \phi_{2B}} \right)} = {\frac{\lambda_{B}}{\lambda_{A}} \cdot h_{1A} \cdot \left( {\phi_{1B} - \phi_{1A}} \right)}}{{\phi_{2A} - \phi_{2B}} = {{- \frac{\lambda_{B}}{\lambda_{A}}} \cdot \left( {\phi_{1B} - \phi_{1A}} \right)}}} & (14) \end{matrix}$

[0073] Here, ${\phi_{1A} - \phi_{1B}} = {{\frac{1}{f_{1A}} - \frac{1}{f_{1B}}} = {\frac{f_{1B} - f_{1A}}{f_{1A}} \cdot f_{1B}}}$

[0074] and assuming that f_(1B)−f_(1A)=Δf₁=−f₁/ν₁, and f_(1A)≈f₁≈f_(1B),

φ_(1A)−φ_(1B) ≈f ₁ /f ₁ ²≈−1/(ν₁ f ₁)  (15)

[0075] Similarly,

φ_(2A)−φ_(2B)≈−1/(ν₂ f ₂)  (16)

[0076] Substitution of the equations (15) and (16) into the equation (14) yields the equation (17). $\begin{matrix} {{- \frac{1}{v_{2} \cdot f_{2}}} = {\frac{\lambda_{B}}{\lambda_{A}} \cdot \frac{1}{v_{1} \cdot f_{1}}}} & (17) \end{matrix}$

[0077] As the equation (17) is converted and is solved about ν₂, $v_{2} = {{- \frac{\lambda_{A}}{\lambda_{B}}} \cdot \frac{f_{1}}{f_{2}} \cdot v_{1}}$

[0078] and when the equation (7) is substituted therein, $\begin{matrix} {v_{2} = {{{- \frac{\lambda_{A}}{\lambda_{B}}} \cdot \frac{f_{1}}{f_{2}} \cdot \frac{\lambda_{B}}{\lambda_{B} - \lambda_{A}} \cdot \frac{f_{1} + f_{2}}{f_{1}}} = {{- \frac{\lambda_{A}}{\lambda_{B} - \lambda_{A}}} \cdot \frac{f_{1} + f_{2}}{f_{2}}}}} & (18) \end{matrix}$

[0079] The equation (18) can be converted to the equation (19) because λ_(B)/(λ_(B)−λ_(A)) is equal to the equivalent Abbe number ν_(DOE) of a diffractive optical element. $\begin{matrix} {v_{2} = {{- \frac{f_{1} + f_{2}}{f_{2}}} \cdot v_{DOE}}} & (19) \end{matrix}$

[0080] The equation (19) is a condition of ν₂ required to the second group 4 b to direct the exiting directions of the beams of the wavelengths λ_(A) and λ_(B) that are incident on the second group 4 b at different incident angles.

[0081] The above descriptions are directed to the chief rays of the wavelengths λ_(A) and λ_(B). In addition to the conditions (8) and (19), the compensating optical system 4 is required to coincide convergence or divergence of the beams of the wavelength λ_(A) and λ_(B) with each other in order to compensate the effect of the chromatic dispersion of the diffractive beam-dividing element 3 in the optical path that is the side of the object surface 10 than the compensating optical system 4. For this purpose, the beams of the wavelengths λ_(A) and λ_(B) should be parallel beams when they are reflected by the second group 4 b.

[0082] As shown in FIG. 3, the beams of the wavelengths λ_(A) and λ_(B) are focused at the points where the distances from the first group 4 a are equal to the focal lengths f_(1A) and f_(1B), respectively. And then, the beams are incident on the second group 4 b as divergent beams. Therefore, a sum of focal lengths f_(1A), f_(2A) and a sum of focal lengths f_(1B), f_(2B) are required to be equal to a principal distance f₁+f₂ between the principal points of the first group 4 a and the second group 4 b in order to collimate the beams of the wavelengths λ_(A) and λ_(B). Further, the compensating optical system 4 should be afocal to both of the wavelengths λ_(A) and λ_(B). These conditions are expressed by the following equations (20). $\begin{matrix} {{{f_{1A} + f_{2A}} = {f_{1B} + f_{2B}}}{{f_{2B} - f_{2A}} = {f_{1A} - f_{1B}}}{{\Delta \quad f_{2}} = {{{{- \Delta}\quad f_{1}} - {f_{2}/v_{2}}} = {f_{1}/v_{1}}}}} & (20) \end{matrix}$

[0083] A combination of values of f₁ and f₂ that satisfies the conditions (8), (19) and (20) is found by substituting the equations (8) and (19) into the equation (20) as follows:

f₁=f₂  (21)

[0084] Further, a combination of values of ν₁ and ν₂ that satisfies the conditions (8), (19) and (20) is found by substituting the equation (20) into the equations (8) and (19) as follows:

ν₁=−ν₂=2ν_(DOE)  (22)

[0085] Next, the relationship between angular magnifications β_(A), β_(B) of the compensating optical system 4 at the wavelengths λ_(A), λ_(B) and the wavelengths λ_(A), λ_(B) per se will be verified.

[0086] The focal length f_(1B) of the first group 4 a at the second wavelength λ_(B) can be converted as follows from the equation (22). $\begin{matrix} \begin{matrix} {f_{1B} = {f_{1A} + {\Delta \quad f_{1}}}} \\ {= {f_{1A} - {f_{1}/v_{1}}}} \\ {= {f_{1A}\left( {1 - {1/v_{1}}} \right)}} \\ {= {f_{1A} \cdot \left( {1 - \frac{\lambda_{B} - \lambda_{A}}{2{\lambda \quad}_{B}}} \right)}} \\ {= {f_{1A} \cdot \left( \frac{\lambda_{A} + \lambda_{B}}{2\lambda_{B}} \right)}} \end{matrix} & (23) \end{matrix}$

[0087] Similarly, the focal length f_(2B) of the second group 4 b at the second wavelength λ_(B) can be converted as follows from the equation (22). $\begin{matrix} \begin{matrix} {f_{2B} = {f_{2A} + {\Delta \quad f_{2}}}} \\ {= {f_{2A} - {f_{2}/v_{2}}}} \\ {= {f_{2A}\left( {1 - {1/v_{2}}} \right)}} \\ {= {f_{2A} \cdot \left( {1 - \frac{\lambda_{B} - \lambda_{A}}{2{\lambda \quad}_{A}}} \right)}} \\ {= {f_{2A} \cdot \left( \frac{\lambda_{A} + \lambda_{B}}{2\lambda_{A}} \right)}} \end{matrix} & (24) \end{matrix}$

[0088] Accordingly, the ratio β_(A)/β_(B) between the angular magnifications β_(A), β_(B) of the compensating optical system 4 at the wavelengths λ_(A), λ_(B) can be obtained from the equations (23) and (24). $\begin{matrix} \begin{matrix} {\frac{\beta_{A}}{\beta_{B}} = {\frac{f_{1A}}{f_{2A}} \cdot \frac{f_{2B}}{f_{1B}}}} \\ {= \frac{f_{1A} \cdot f_{2A} \cdot \frac{\lambda_{A} + \lambda_{B}}{2\lambda_{A}}}{f_{2A} \cdot f_{1A} \cdot \frac{\lambda_{A} + \lambda_{B}}{2\lambda_{B}}}} \\ {= {\lambda_{B}/\lambda_{A}}} \end{matrix} & (25) \end{matrix}$

[0089] The equation (25) shows that the angular magnification of the compensating optical system 4 satisfying the condition (22) is inversely proportional to the wavelength of the incident beam.

[0090] Next, a numerical example of the compensating optical system 4 that satisfies the conditions (21) and (22) will be described.

[0091] In the present example, the focal lengths f₁, f₂ and the Abbe numbers ν₁, ν₂ Of the first and second groups 4 a, 4 b are fixed as follows:

[0092] The first group 4 a: f₁=120, ν₁=2ν_(DOE)

[0093] The second group 4 b: f₂=120, ν₂=−2ν_(DOE)

[0094] It should be noted that a resultant total focal length f of a composite optical element, which consists of a reflecting surface and a diffractive lens structure formed thereon, is defined as a resultant total value of the component f_(ref) due to the power of a curved reflecting surface and the component f_(dif) due to the power caused by the diffracting lens structure as expressed by the equation (26). $\begin{matrix} {\frac{1}{f} = {\frac{1}{f_{dif}} + \frac{1}{f_{ref}}}} & (26) \end{matrix}$

[0095] Further, a resultant total Abbe number ν of such a composite optical element has the following relationship as shown in the equation (27) with the focal lengths f, f_(ref), f_(dif), the Abbe number of a reflecting mirror ν_(ref) (=∞), and an equivalent Abbe number ν_(DOE). $\begin{matrix} \begin{matrix} {\frac{1}{f \cdot v} = {\frac{1}{f_{dif} \cdot v_{DOE}} + \frac{1}{f_{ref} \cdot v_{ref}}}} \\ {= \frac{1}{f_{dif} \cdot v_{DOE}}} \end{matrix} & (27) \end{matrix}$

[0096] Substitution of f=f₁=120, ν=ν₁=2ν_(DOE) into the equation (27) yields the diffractive component f_(1dif) of the focal length of the first group 4 a.

f_(1dif)=240

[0097] In the same manner, substitution of f=f₂=120, ν=ν₂=−2ν_(DOE) into the equation (27) yields the diffractive component f_(2dif) of the focal length of the second group 4 b.

f_(2dif)=−240

[0098] On the other hand, substitution of f_(dif)=f_(1dif)=240, f=f₁=120 into the equation (26) yields the reflecting component f_(1ref) of the focal length of the first group 4 a.

f_(1ref)=240

[0099] In the same manner, substitution of f_(dif)=f_(2dif)=−240, f=f₂=120 into the equation (26) yields the reflecting component f_(2ref) of the focal length of the second group 4 b.

f_(2ref)=80

[0100] The following TABLE provides a summary of specification of the compensating optical system 4 of the numerical example. TABLE First group 4a Resultant total Abbe number ν₁  2 ν_(DOE) Resultant total focal length f₁ 120 Reflecting component f_(1ref) 240 Diffractive component f_(1dif) 240 Second group 4b Resultant total Abbe number ν₂ −2 ν_(DOE) Resultant total focal length f₂ 120 Reflecting component f_(2ref) 80 Diffractive component f_(2dif) −240

[0101] With this setting, since the compensating optical system 4 satisfies the conditions (8), (19) and (20), the system 4 perfectly compensates an angular difference of the same order diffracted beams caused by the wavelength dependence of the diffractive beam-dividing element 3.

[0102] As described above, according to the present invention, an angular difference among the same order diffracted beams having different peak wavelengths caused by the wavelength dependence of a diffractive beam-dividing element can be compensated by the chromatic dispersion of the compensating optical system. Therefore, the same order diffracted beams diffracted at different angles can be directed in the same direction at the same position.

[0103] Accordingly, the defect such as a separation of the same order diffracted beam or a variation of the beam spot pitch due to difference of wavelength can be avoided while employing a diffractive beam-dividing element that is in no need of cementing and is able to divide the incident beam with high accuracy.

[0104] The present disclosure relates to the subject matter contained in Japanese Patent Application No. 2000-1192, filed on Jan. 7, 2000, which is expressly incorporated herein by reference in its entirety. 

What is claimed is:
 1. A multibeam optical system, comprising: a laser source that emits a laser beam; a diffractive beam-dividing element that diffracts the laser beam emitted from said laser source to be divided into a plurality of diffracted beams exiting at different diffraction angles, respectively; and a compensating optical system, which is afocal and consists of a first group and a second group, arranged at the position where the divided beams are incident thereon, wherein the angular magnification of said compensating optical system is inversely proportional to the wavelength of the incident beam.
 2. The multibeam optical system according to claim 1 , wherein both of said first and second groups are provided with diffractive lens structures, respectively.
 3. The multibeam optical system according to claim 2 , wherein both of said first and second groups have reflecting surfaces of positive powers on which said diffractive lens structures are formed.
 4. The multibeam optical system according to claim 1 , wherein said laser source comprises a multiline laser source that emits a laser beam having a plurality of peak wavelengths;
 5. A multibeam optical system, comprising: a multiline laser source that emits a laser beam having a plurality of peak wavelengths; a diffractive beam-dividing element that diffracts the laser beam emitted from said laser source to be divided into a plurality of diffracted beams exiting at different diffraction angles, respectively; and a compensating optical system that is arranged at the position where the divided beams are incident thereon, said compensating optical system being afocal and consisting of a first group and a second group, wherein said compensating optical system substantially satisfies the following conditions (1) and (2): $\begin{matrix} {v_{1} = {\frac{f_{1} + f_{2}}{f_{1}} \cdot v_{DOE}}} & (1) \\ {v_{2} = {{- \frac{f_{1} + f_{2}}{f_{2}\quad}} \cdot v_{DOE}}} & (2) \end{matrix}$

where ν₁ is the Abbe number of said first group, f₁ is the focal length of said first group, ν₂ is the Abbe number of said second group, f₂ is the focal length of said second group, and ν_(DOE) is a dispersive power of said diffractive beam-dividing element, which corresponds to an Abbe number of a refractive lens.
 6. The multibeam optical system according to claim 5 , wherein said compensating optical system further substantially satisfies the following conditions (3), (4) and (5): $\begin{matrix} {\frac{f_{1}}{v_{1}} = {- \frac{f_{2}}{v_{2}}}} & (3) \\ {f_{1} = f_{2}} & (4) \\ {v_{1} = {{- v_{2}} = {2{v_{DOE}.}}}} & (5) \end{matrix}$


7. The multibeam optical system according to claim 5 , wherein both of said first and second groups are provided with diffractive lens structures, respectively.
 8. The multibeam optical system according to claim 7 , wherein both of said first and second groups have reflecting surfaces of positive powers on which said diffractive lens structures are formed.
 9. The multibeam optical system according to claim 5 , wherein said first group is located at a position where the distance from said diffractive beam-dividing element is equal to the focal length f₁ of said first group. 